Some basic questions on halt and move in Turing machines“Print 'em all game” for Turing machinesPower of variants of Turing machinesThe control in the Turing MachineThe halting problem of Turing machines in view of enumeration of initial tape configurationsDifficulty in the halting problem for a simple Turing machine with standard enumerations of programs and of initial tape configurationsTuring machine that computes w#w when the input is w?Construct a Turing Machine that recognizes the set $0^2n1^n$For multi-tape Turing machines, can we assume that each tape can be in its own state independently of the other tapes?How would you create a Turing machine that copies a string and prints it to the tape?Turing machine - Transition between two states by more than one condition allowed?

What is the offset in a seaplane's hull?

I see my dog run

Is domain driven design an anti-SQL pattern?

How is it possible for user's password to be changed after storage was encrypted? (on OS X, Android)

Can I interfere when another PC is about to be attacked?

Is Fable (1996) connected in any way to the Fable franchise from Lionhead Studios?

Check if two datetimes are between two others

2015 GMC truck check engine light no longer on

Eliminate empty elements from a list with a specifict pattern

Wild Shape Centaur Into a Giant Elk: do their Charges stack?

Where to refill my bottle in India?

Is Social Media Science Fiction?

"listening to me about as much as you're listening to this pole here"

How can I fix this gap between bookcases I made?

What is the command to reset a PC without deleting any files

Domain expired, GoDaddy holds it and is asking more money

Are white and non-white police officers equally likely to kill black suspects?

Why doesn't a const reference extend the life of a temporary object passed via a function?

OA final episode explanation

Shall I use personal or official e-mail account when registering to external websites for work purpose?

Is it legal to have the "// (c) 2019 John Smith" header in all files when there are hundreds of contributors?

Why is the design of haulage companies so “special”?

Why is an old chain unsafe?

How would photo IDs work for shapeshifters?



Some basic questions on halt and move in Turing machines


“Print 'em all game” for Turing machinesPower of variants of Turing machinesThe control in the Turing MachineThe halting problem of Turing machines in view of enumeration of initial tape configurationsDifficulty in the halting problem for a simple Turing machine with standard enumerations of programs and of initial tape configurationsTuring machine that computes w#w when the input is w?Construct a Turing Machine that recognizes the set $0^2n1^n$For multi-tape Turing machines, can we assume that each tape can be in its own state independently of the other tapes?How would you create a Turing machine that copies a string and prints it to the tape?Turing machine - Transition between two states by more than one condition allowed?













1












$begingroup$


Im trying to learn about and set up Turing Machines (TMs) the simplest ways using the simplest definite rules. I am using my previous knowledge on simple Cellular Automata to do this. I want to write the computer code, but first I have to get some understanding of the restrictions and possibilities of TMs.



Firstly i define an operation as follows:



Operation (Op)



Do operation based on current color ($C$) and its state ($S$) i.e. $Op(c, s)$:



  1. replace color $C$ with $0$ or $1$. (at current position of tape head) move

  2. tape-head (change its position).

  3. change state $S$ with $0$ or $1$ (at new position).

For each operation:



  • In general does a TM only have only one halting-operation?
    (i.e. can only one operation promote the halting or can more than one operation do that?).


  • Can the tape-head also stop at a fixed position? (i.e. not move its head).
    Instead of the rules $0$ (move left) and $1$ (move right), it can also $2$ (not move anywhere) or even jump two units to the left or right?


My last question is basically the same as the last question..



  • Can the tape-head move more than one unit to the left or right?

The reason I ask this, is because if there is only one halting state in no more than one operation, the number of rules (in my setup) can be reduced. And if the tape-head can move more than one unit either to the left or right or both my guess is that it can produce more complex outputs. But my questions are concerning what is the limitations of a Turing Machine.



Example



If something was unclear I can try this example:



 inp: outp:
Op(0,0) => 110
Op(0,1) => 101
Op(1,0) => 111
Op(1,1) => 001*


Of the output ($b_2b_1b_0$), where the first bit ($b_0$) represent the tapehead-move direction, $b_1$ represents the new state, and $b_0$ represents the changed color.
The asterisk shows that a halting operation should be performed.



The first question I asked wether there was possible to have more than one halting operation in a TM. Basically I ask wether I can have two or more asterisks like this, or if its not allowed:



 inp: outp:
Op(0,0) => 110
Op(0,1) => 101
Op(1,0) => 111*
Op(1,1) => 001*


Recap



So can more than one operation perform the halting operation?



Can we move the tape head more than one unit to the left or right, or can it stand still?










share|cite|improve this question









$endgroup$











  • $begingroup$
    You can define your Turing machine model in whichever reasonable way you want, as long as the resulting model is equal in power to a standard Turing machine.
    $endgroup$
    – Yuval Filmus
    5 hours ago






  • 1




    $begingroup$
    If you are interested in a specific model of Turing machines, then you'll have to specify your model, and then you'll likely be able to answer these questions on your own.
    $endgroup$
    – Yuval Filmus
    5 hours ago










  • $begingroup$
    Thanks, but where can I find info on a standard Turing machine? Was my above descriptions close?
    $endgroup$
    – Natural Number Guy
    5 hours ago






  • 3




    $begingroup$
    There is no single standard model of a Turing machine. You can find (similar but not identical) definitions on Wikipedia and in any number of textbooks.
    $endgroup$
    – Yuval Filmus
    5 hours ago















1












$begingroup$


Im trying to learn about and set up Turing Machines (TMs) the simplest ways using the simplest definite rules. I am using my previous knowledge on simple Cellular Automata to do this. I want to write the computer code, but first I have to get some understanding of the restrictions and possibilities of TMs.



Firstly i define an operation as follows:



Operation (Op)



Do operation based on current color ($C$) and its state ($S$) i.e. $Op(c, s)$:



  1. replace color $C$ with $0$ or $1$. (at current position of tape head) move

  2. tape-head (change its position).

  3. change state $S$ with $0$ or $1$ (at new position).

For each operation:



  • In general does a TM only have only one halting-operation?
    (i.e. can only one operation promote the halting or can more than one operation do that?).


  • Can the tape-head also stop at a fixed position? (i.e. not move its head).
    Instead of the rules $0$ (move left) and $1$ (move right), it can also $2$ (not move anywhere) or even jump two units to the left or right?


My last question is basically the same as the last question..



  • Can the tape-head move more than one unit to the left or right?

The reason I ask this, is because if there is only one halting state in no more than one operation, the number of rules (in my setup) can be reduced. And if the tape-head can move more than one unit either to the left or right or both my guess is that it can produce more complex outputs. But my questions are concerning what is the limitations of a Turing Machine.



Example



If something was unclear I can try this example:



 inp: outp:
Op(0,0) => 110
Op(0,1) => 101
Op(1,0) => 111
Op(1,1) => 001*


Of the output ($b_2b_1b_0$), where the first bit ($b_0$) represent the tapehead-move direction, $b_1$ represents the new state, and $b_0$ represents the changed color.
The asterisk shows that a halting operation should be performed.



The first question I asked wether there was possible to have more than one halting operation in a TM. Basically I ask wether I can have two or more asterisks like this, or if its not allowed:



 inp: outp:
Op(0,0) => 110
Op(0,1) => 101
Op(1,0) => 111*
Op(1,1) => 001*


Recap



So can more than one operation perform the halting operation?



Can we move the tape head more than one unit to the left or right, or can it stand still?










share|cite|improve this question









$endgroup$











  • $begingroup$
    You can define your Turing machine model in whichever reasonable way you want, as long as the resulting model is equal in power to a standard Turing machine.
    $endgroup$
    – Yuval Filmus
    5 hours ago






  • 1




    $begingroup$
    If you are interested in a specific model of Turing machines, then you'll have to specify your model, and then you'll likely be able to answer these questions on your own.
    $endgroup$
    – Yuval Filmus
    5 hours ago










  • $begingroup$
    Thanks, but where can I find info on a standard Turing machine? Was my above descriptions close?
    $endgroup$
    – Natural Number Guy
    5 hours ago






  • 3




    $begingroup$
    There is no single standard model of a Turing machine. You can find (similar but not identical) definitions on Wikipedia and in any number of textbooks.
    $endgroup$
    – Yuval Filmus
    5 hours ago













1












1








1





$begingroup$


Im trying to learn about and set up Turing Machines (TMs) the simplest ways using the simplest definite rules. I am using my previous knowledge on simple Cellular Automata to do this. I want to write the computer code, but first I have to get some understanding of the restrictions and possibilities of TMs.



Firstly i define an operation as follows:



Operation (Op)



Do operation based on current color ($C$) and its state ($S$) i.e. $Op(c, s)$:



  1. replace color $C$ with $0$ or $1$. (at current position of tape head) move

  2. tape-head (change its position).

  3. change state $S$ with $0$ or $1$ (at new position).

For each operation:



  • In general does a TM only have only one halting-operation?
    (i.e. can only one operation promote the halting or can more than one operation do that?).


  • Can the tape-head also stop at a fixed position? (i.e. not move its head).
    Instead of the rules $0$ (move left) and $1$ (move right), it can also $2$ (not move anywhere) or even jump two units to the left or right?


My last question is basically the same as the last question..



  • Can the tape-head move more than one unit to the left or right?

The reason I ask this, is because if there is only one halting state in no more than one operation, the number of rules (in my setup) can be reduced. And if the tape-head can move more than one unit either to the left or right or both my guess is that it can produce more complex outputs. But my questions are concerning what is the limitations of a Turing Machine.



Example



If something was unclear I can try this example:



 inp: outp:
Op(0,0) => 110
Op(0,1) => 101
Op(1,0) => 111
Op(1,1) => 001*


Of the output ($b_2b_1b_0$), where the first bit ($b_0$) represent the tapehead-move direction, $b_1$ represents the new state, and $b_0$ represents the changed color.
The asterisk shows that a halting operation should be performed.



The first question I asked wether there was possible to have more than one halting operation in a TM. Basically I ask wether I can have two or more asterisks like this, or if its not allowed:



 inp: outp:
Op(0,0) => 110
Op(0,1) => 101
Op(1,0) => 111*
Op(1,1) => 001*


Recap



So can more than one operation perform the halting operation?



Can we move the tape head more than one unit to the left or right, or can it stand still?










share|cite|improve this question









$endgroup$




Im trying to learn about and set up Turing Machines (TMs) the simplest ways using the simplest definite rules. I am using my previous knowledge on simple Cellular Automata to do this. I want to write the computer code, but first I have to get some understanding of the restrictions and possibilities of TMs.



Firstly i define an operation as follows:



Operation (Op)



Do operation based on current color ($C$) and its state ($S$) i.e. $Op(c, s)$:



  1. replace color $C$ with $0$ or $1$. (at current position of tape head) move

  2. tape-head (change its position).

  3. change state $S$ with $0$ or $1$ (at new position).

For each operation:



  • In general does a TM only have only one halting-operation?
    (i.e. can only one operation promote the halting or can more than one operation do that?).


  • Can the tape-head also stop at a fixed position? (i.e. not move its head).
    Instead of the rules $0$ (move left) and $1$ (move right), it can also $2$ (not move anywhere) or even jump two units to the left or right?


My last question is basically the same as the last question..



  • Can the tape-head move more than one unit to the left or right?

The reason I ask this, is because if there is only one halting state in no more than one operation, the number of rules (in my setup) can be reduced. And if the tape-head can move more than one unit either to the left or right or both my guess is that it can produce more complex outputs. But my questions are concerning what is the limitations of a Turing Machine.



Example



If something was unclear I can try this example:



 inp: outp:
Op(0,0) => 110
Op(0,1) => 101
Op(1,0) => 111
Op(1,1) => 001*


Of the output ($b_2b_1b_0$), where the first bit ($b_0$) represent the tapehead-move direction, $b_1$ represents the new state, and $b_0$ represents the changed color.
The asterisk shows that a halting operation should be performed.



The first question I asked wether there was possible to have more than one halting operation in a TM. Basically I ask wether I can have two or more asterisks like this, or if its not allowed:



 inp: outp:
Op(0,0) => 110
Op(0,1) => 101
Op(1,0) => 111*
Op(1,1) => 001*


Recap



So can more than one operation perform the halting operation?



Can we move the tape head more than one unit to the left or right, or can it stand still?







turing-machines automata






share|cite|improve this question













share|cite|improve this question











share|cite|improve this question




share|cite|improve this question










asked 5 hours ago









Natural Number GuyNatural Number Guy

1084




1084











  • $begingroup$
    You can define your Turing machine model in whichever reasonable way you want, as long as the resulting model is equal in power to a standard Turing machine.
    $endgroup$
    – Yuval Filmus
    5 hours ago






  • 1




    $begingroup$
    If you are interested in a specific model of Turing machines, then you'll have to specify your model, and then you'll likely be able to answer these questions on your own.
    $endgroup$
    – Yuval Filmus
    5 hours ago










  • $begingroup$
    Thanks, but where can I find info on a standard Turing machine? Was my above descriptions close?
    $endgroup$
    – Natural Number Guy
    5 hours ago






  • 3




    $begingroup$
    There is no single standard model of a Turing machine. You can find (similar but not identical) definitions on Wikipedia and in any number of textbooks.
    $endgroup$
    – Yuval Filmus
    5 hours ago
















  • $begingroup$
    You can define your Turing machine model in whichever reasonable way you want, as long as the resulting model is equal in power to a standard Turing machine.
    $endgroup$
    – Yuval Filmus
    5 hours ago






  • 1




    $begingroup$
    If you are interested in a specific model of Turing machines, then you'll have to specify your model, and then you'll likely be able to answer these questions on your own.
    $endgroup$
    – Yuval Filmus
    5 hours ago










  • $begingroup$
    Thanks, but where can I find info on a standard Turing machine? Was my above descriptions close?
    $endgroup$
    – Natural Number Guy
    5 hours ago






  • 3




    $begingroup$
    There is no single standard model of a Turing machine. You can find (similar but not identical) definitions on Wikipedia and in any number of textbooks.
    $endgroup$
    – Yuval Filmus
    5 hours ago















$begingroup$
You can define your Turing machine model in whichever reasonable way you want, as long as the resulting model is equal in power to a standard Turing machine.
$endgroup$
– Yuval Filmus
5 hours ago




$begingroup$
You can define your Turing machine model in whichever reasonable way you want, as long as the resulting model is equal in power to a standard Turing machine.
$endgroup$
– Yuval Filmus
5 hours ago




1




1




$begingroup$
If you are interested in a specific model of Turing machines, then you'll have to specify your model, and then you'll likely be able to answer these questions on your own.
$endgroup$
– Yuval Filmus
5 hours ago




$begingroup$
If you are interested in a specific model of Turing machines, then you'll have to specify your model, and then you'll likely be able to answer these questions on your own.
$endgroup$
– Yuval Filmus
5 hours ago












$begingroup$
Thanks, but where can I find info on a standard Turing machine? Was my above descriptions close?
$endgroup$
– Natural Number Guy
5 hours ago




$begingroup$
Thanks, but where can I find info on a standard Turing machine? Was my above descriptions close?
$endgroup$
– Natural Number Guy
5 hours ago




3




3




$begingroup$
There is no single standard model of a Turing machine. You can find (similar but not identical) definitions on Wikipedia and in any number of textbooks.
$endgroup$
– Yuval Filmus
5 hours ago




$begingroup$
There is no single standard model of a Turing machine. You can find (similar but not identical) definitions on Wikipedia and in any number of textbooks.
$endgroup$
– Yuval Filmus
5 hours ago










1 Answer
1






active

oldest

votes


















3












$begingroup$

To answer any kind of question like this, you need to choose one of the standard definitions of Turing machines (there are several but they're all essentially the same) and prove that adding the feature you want doesn't increase the computational power. You do that by showing how to simulate the feature using the standard machine.




  • In general does a TM only have only one halting-operation? (i.e. can only one operation promote the halting or can more than one operation do that?).



It doesn't matter. If you want three halting states and I insist that there can be only one, then have three states called $h_1$, $h_2$ and $h_3$ and design the transition function so that, if the machine ever enters one of those, its next transition is to $mathrmHALT$.




  • Can the tape-head also stop at a fixed position? (i.e. not move its head). Instead of the rules 0 (move left) and 1 (move right), it can also 2 (not move anywhere) or even jump two units to the left or right?



Again, it doesn't matter. If I insist you must move left or right, you can move one step left and then move back to the right; you can move two steps to the right by moving one step, twice.




  • Can the tape-head move more than one unit to the left or right?



Even that doesn't affect things: random-access Turing machines have an "address tape" onto which you can write a number and a special state that causes the head to move straight to the tape cell indexed by that number. Again, same power.



Multiple tapes, inserting and deleting characters, two-dimensional (or more!) tapes. Almost anything you can imagine makes no difference, and proving these things are standard exercises in computation theory textbooks.






share|cite|improve this answer









$endgroup$













    Your Answer





    StackExchange.ifUsing("editor", function ()
    return StackExchange.using("mathjaxEditing", function ()
    StackExchange.MarkdownEditor.creationCallbacks.add(function (editor, postfix)
    StackExchange.mathjaxEditing.prepareWmdForMathJax(editor, postfix, [["$", "$"], ["\\(","\\)"]]);
    );
    );
    , "mathjax-editing");

    StackExchange.ready(function()
    var channelOptions =
    tags: "".split(" "),
    id: "419"
    ;
    initTagRenderer("".split(" "), "".split(" "), channelOptions);

    StackExchange.using("externalEditor", function()
    // Have to fire editor after snippets, if snippets enabled
    if (StackExchange.settings.snippets.snippetsEnabled)
    StackExchange.using("snippets", function()
    createEditor();
    );

    else
    createEditor();

    );

    function createEditor()
    StackExchange.prepareEditor(
    heartbeatType: 'answer',
    autoActivateHeartbeat: false,
    convertImagesToLinks: false,
    noModals: true,
    showLowRepImageUploadWarning: true,
    reputationToPostImages: null,
    bindNavPrevention: true,
    postfix: "",
    imageUploader:
    brandingHtml: "Powered by u003ca class="icon-imgur-white" href="https://imgur.com/"u003eu003c/au003e",
    contentPolicyHtml: "User contributions licensed under u003ca href="https://creativecommons.org/licenses/by-sa/3.0/"u003ecc by-sa 3.0 with attribution requiredu003c/au003e u003ca href="https://stackoverflow.com/legal/content-policy"u003e(content policy)u003c/au003e",
    allowUrls: true
    ,
    onDemand: true,
    discardSelector: ".discard-answer"
    ,immediatelyShowMarkdownHelp:true
    );



    );













    draft saved

    draft discarded


















    StackExchange.ready(
    function ()
    StackExchange.openid.initPostLogin('.new-post-login', 'https%3a%2f%2fcs.stackexchange.com%2fquestions%2f106651%2fsome-basic-questions-on-halt-and-move-in-turing-machines%23new-answer', 'question_page');

    );

    Post as a guest















    Required, but never shown

























    1 Answer
    1






    active

    oldest

    votes








    1 Answer
    1






    active

    oldest

    votes









    active

    oldest

    votes






    active

    oldest

    votes









    3












    $begingroup$

    To answer any kind of question like this, you need to choose one of the standard definitions of Turing machines (there are several but they're all essentially the same) and prove that adding the feature you want doesn't increase the computational power. You do that by showing how to simulate the feature using the standard machine.




    • In general does a TM only have only one halting-operation? (i.e. can only one operation promote the halting or can more than one operation do that?).



    It doesn't matter. If you want three halting states and I insist that there can be only one, then have three states called $h_1$, $h_2$ and $h_3$ and design the transition function so that, if the machine ever enters one of those, its next transition is to $mathrmHALT$.




    • Can the tape-head also stop at a fixed position? (i.e. not move its head). Instead of the rules 0 (move left) and 1 (move right), it can also 2 (not move anywhere) or even jump two units to the left or right?



    Again, it doesn't matter. If I insist you must move left or right, you can move one step left and then move back to the right; you can move two steps to the right by moving one step, twice.




    • Can the tape-head move more than one unit to the left or right?



    Even that doesn't affect things: random-access Turing machines have an "address tape" onto which you can write a number and a special state that causes the head to move straight to the tape cell indexed by that number. Again, same power.



    Multiple tapes, inserting and deleting characters, two-dimensional (or more!) tapes. Almost anything you can imagine makes no difference, and proving these things are standard exercises in computation theory textbooks.






    share|cite|improve this answer









    $endgroup$

















      3












      $begingroup$

      To answer any kind of question like this, you need to choose one of the standard definitions of Turing machines (there are several but they're all essentially the same) and prove that adding the feature you want doesn't increase the computational power. You do that by showing how to simulate the feature using the standard machine.




      • In general does a TM only have only one halting-operation? (i.e. can only one operation promote the halting or can more than one operation do that?).



      It doesn't matter. If you want three halting states and I insist that there can be only one, then have three states called $h_1$, $h_2$ and $h_3$ and design the transition function so that, if the machine ever enters one of those, its next transition is to $mathrmHALT$.




      • Can the tape-head also stop at a fixed position? (i.e. not move its head). Instead of the rules 0 (move left) and 1 (move right), it can also 2 (not move anywhere) or even jump two units to the left or right?



      Again, it doesn't matter. If I insist you must move left or right, you can move one step left and then move back to the right; you can move two steps to the right by moving one step, twice.




      • Can the tape-head move more than one unit to the left or right?



      Even that doesn't affect things: random-access Turing machines have an "address tape" onto which you can write a number and a special state that causes the head to move straight to the tape cell indexed by that number. Again, same power.



      Multiple tapes, inserting and deleting characters, two-dimensional (or more!) tapes. Almost anything you can imagine makes no difference, and proving these things are standard exercises in computation theory textbooks.






      share|cite|improve this answer









      $endgroup$















        3












        3








        3





        $begingroup$

        To answer any kind of question like this, you need to choose one of the standard definitions of Turing machines (there are several but they're all essentially the same) and prove that adding the feature you want doesn't increase the computational power. You do that by showing how to simulate the feature using the standard machine.




        • In general does a TM only have only one halting-operation? (i.e. can only one operation promote the halting or can more than one operation do that?).



        It doesn't matter. If you want three halting states and I insist that there can be only one, then have three states called $h_1$, $h_2$ and $h_3$ and design the transition function so that, if the machine ever enters one of those, its next transition is to $mathrmHALT$.




        • Can the tape-head also stop at a fixed position? (i.e. not move its head). Instead of the rules 0 (move left) and 1 (move right), it can also 2 (not move anywhere) or even jump two units to the left or right?



        Again, it doesn't matter. If I insist you must move left or right, you can move one step left and then move back to the right; you can move two steps to the right by moving one step, twice.




        • Can the tape-head move more than one unit to the left or right?



        Even that doesn't affect things: random-access Turing machines have an "address tape" onto which you can write a number and a special state that causes the head to move straight to the tape cell indexed by that number. Again, same power.



        Multiple tapes, inserting and deleting characters, two-dimensional (or more!) tapes. Almost anything you can imagine makes no difference, and proving these things are standard exercises in computation theory textbooks.






        share|cite|improve this answer









        $endgroup$



        To answer any kind of question like this, you need to choose one of the standard definitions of Turing machines (there are several but they're all essentially the same) and prove that adding the feature you want doesn't increase the computational power. You do that by showing how to simulate the feature using the standard machine.




        • In general does a TM only have only one halting-operation? (i.e. can only one operation promote the halting or can more than one operation do that?).



        It doesn't matter. If you want three halting states and I insist that there can be only one, then have three states called $h_1$, $h_2$ and $h_3$ and design the transition function so that, if the machine ever enters one of those, its next transition is to $mathrmHALT$.




        • Can the tape-head also stop at a fixed position? (i.e. not move its head). Instead of the rules 0 (move left) and 1 (move right), it can also 2 (not move anywhere) or even jump two units to the left or right?



        Again, it doesn't matter. If I insist you must move left or right, you can move one step left and then move back to the right; you can move two steps to the right by moving one step, twice.




        • Can the tape-head move more than one unit to the left or right?



        Even that doesn't affect things: random-access Turing machines have an "address tape" onto which you can write a number and a special state that causes the head to move straight to the tape cell indexed by that number. Again, same power.



        Multiple tapes, inserting and deleting characters, two-dimensional (or more!) tapes. Almost anything you can imagine makes no difference, and proving these things are standard exercises in computation theory textbooks.







        share|cite|improve this answer












        share|cite|improve this answer



        share|cite|improve this answer










        answered 4 hours ago









        David RicherbyDavid Richerby

        69.7k15106195




        69.7k15106195



























            draft saved

            draft discarded
















































            Thanks for contributing an answer to Computer Science Stack Exchange!


            • Please be sure to answer the question. Provide details and share your research!

            But avoid


            • Asking for help, clarification, or responding to other answers.

            • Making statements based on opinion; back them up with references or personal experience.

            Use MathJax to format equations. MathJax reference.


            To learn more, see our tips on writing great answers.




            draft saved


            draft discarded














            StackExchange.ready(
            function ()
            StackExchange.openid.initPostLogin('.new-post-login', 'https%3a%2f%2fcs.stackexchange.com%2fquestions%2f106651%2fsome-basic-questions-on-halt-and-move-in-turing-machines%23new-answer', 'question_page');

            );

            Post as a guest















            Required, but never shown





















































            Required, but never shown














            Required, but never shown












            Required, but never shown







            Required, but never shown

































            Required, but never shown














            Required, but never shown












            Required, but never shown







            Required, but never shown







            Popular posts from this blog

            名間水力發電廠 目录 沿革 設施 鄰近設施 註釋 外部連結 导航菜单23°50′10″N 120°42′41″E / 23.83611°N 120.71139°E / 23.83611; 120.7113923°50′10″N 120°42′41″E / 23.83611°N 120.71139°E / 23.83611; 120.71139計畫概要原始内容臺灣第一座BOT 模式開發的水力發電廠-名間水力電廠名間水力發電廠 水利署首件BOT案原始内容《小檔案》名間電廠 首座BOT水力發電廠原始内容名間電廠BOT - 經濟部水利署中區水資源局

            格濟夫卡 參考資料 导航菜单51°3′40″N 34°2′21″E / 51.06111°N 34.03917°E / 51.06111; 34.03917ГезівкаПогода в селі 编辑或修订